$G$ be a group where $G= mathbb{Z}_6 oplus mathbb{Z}_8$ and the normal subgroup $H=langle(2,4)rangle$ use...












0












$begingroup$


I have the elements of $H$:
$langle(2,4)rangle={(2,4),(4,0),(0,4),(2,0),(4,4),(0,0)}$
where $|G/H|=8$



possible isomorphic classes:
$mathbb{Z}_8$ ,$mathbb{Z}_4oplus mathbb{Z}_2$, $mathbb{Z}_2oplus mathbb{Z}_2 oplus mathbb{Z}_2$



I know



$mathbb{Z}_6 oplus mathbb{Z}_8$ has an element of order $8$ and $mathbb{Z}_2 oplus mathbb{Z}_2 oplus mathbb{Z}_2$ has no element of order $8$, so that leaves $G/H$ is either isomorphic to $mathbb{Z}_8$ or $mathbb{Z}_4 oplus mathbb{Z}_2$.



I don't know how to find which one it is between those two.
I know I need to compare the orders.










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$endgroup$












  • $begingroup$
    Possible duplicate of Find an isomorphism
    $endgroup$
    – user595420
    Dec 5 '18 at 12:26
















0












$begingroup$


I have the elements of $H$:
$langle(2,4)rangle={(2,4),(4,0),(0,4),(2,0),(4,4),(0,0)}$
where $|G/H|=8$



possible isomorphic classes:
$mathbb{Z}_8$ ,$mathbb{Z}_4oplus mathbb{Z}_2$, $mathbb{Z}_2oplus mathbb{Z}_2 oplus mathbb{Z}_2$



I know



$mathbb{Z}_6 oplus mathbb{Z}_8$ has an element of order $8$ and $mathbb{Z}_2 oplus mathbb{Z}_2 oplus mathbb{Z}_2$ has no element of order $8$, so that leaves $G/H$ is either isomorphic to $mathbb{Z}_8$ or $mathbb{Z}_4 oplus mathbb{Z}_2$.



I don't know how to find which one it is between those two.
I know I need to compare the orders.










share|cite|improve this question











$endgroup$












  • $begingroup$
    Possible duplicate of Find an isomorphism
    $endgroup$
    – user595420
    Dec 5 '18 at 12:26














0












0








0





$begingroup$


I have the elements of $H$:
$langle(2,4)rangle={(2,4),(4,0),(0,4),(2,0),(4,4),(0,0)}$
where $|G/H|=8$



possible isomorphic classes:
$mathbb{Z}_8$ ,$mathbb{Z}_4oplus mathbb{Z}_2$, $mathbb{Z}_2oplus mathbb{Z}_2 oplus mathbb{Z}_2$



I know



$mathbb{Z}_6 oplus mathbb{Z}_8$ has an element of order $8$ and $mathbb{Z}_2 oplus mathbb{Z}_2 oplus mathbb{Z}_2$ has no element of order $8$, so that leaves $G/H$ is either isomorphic to $mathbb{Z}_8$ or $mathbb{Z}_4 oplus mathbb{Z}_2$.



I don't know how to find which one it is between those two.
I know I need to compare the orders.










share|cite|improve this question











$endgroup$




I have the elements of $H$:
$langle(2,4)rangle={(2,4),(4,0),(0,4),(2,0),(4,4),(0,0)}$
where $|G/H|=8$



possible isomorphic classes:
$mathbb{Z}_8$ ,$mathbb{Z}_4oplus mathbb{Z}_2$, $mathbb{Z}_2oplus mathbb{Z}_2 oplus mathbb{Z}_2$



I know



$mathbb{Z}_6 oplus mathbb{Z}_8$ has an element of order $8$ and $mathbb{Z}_2 oplus mathbb{Z}_2 oplus mathbb{Z}_2$ has no element of order $8$, so that leaves $G/H$ is either isomorphic to $mathbb{Z}_8$ or $mathbb{Z}_4 oplus mathbb{Z}_2$.



I don't know how to find which one it is between those two.
I know I need to compare the orders.







abstract-algebra group-theory group-isomorphism






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edited Dec 5 '18 at 14:28









amWhy

192k28225439




192k28225439










asked Dec 5 '18 at 3:31







user595420



















  • $begingroup$
    Possible duplicate of Find an isomorphism
    $endgroup$
    – user595420
    Dec 5 '18 at 12:26


















  • $begingroup$
    Possible duplicate of Find an isomorphism
    $endgroup$
    – user595420
    Dec 5 '18 at 12:26
















$begingroup$
Possible duplicate of Find an isomorphism
$endgroup$
– user595420
Dec 5 '18 at 12:26




$begingroup$
Possible duplicate of Find an isomorphism
$endgroup$
– user595420
Dec 5 '18 at 12:26










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$begingroup$

But $mathbb Z_4oplusmathbb Z_2$ similarly has no element of order $8$.



The question, though, is does $G/H$ have an element of order $8$; or an element of order $4$. It doesn't have an element of order $8$, because the coset $(0,1)+H$ has order $4$. And we can see that no other coset has order $8$.



So there's our answer: $mathbb Z_4oplusmathbb Z_2$.






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    1 Answer
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    $begingroup$

    But $mathbb Z_4oplusmathbb Z_2$ similarly has no element of order $8$.



    The question, though, is does $G/H$ have an element of order $8$; or an element of order $4$. It doesn't have an element of order $8$, because the coset $(0,1)+H$ has order $4$. And we can see that no other coset has order $8$.



    So there's our answer: $mathbb Z_4oplusmathbb Z_2$.






    share|cite|improve this answer











    $endgroup$


















      1












      $begingroup$

      But $mathbb Z_4oplusmathbb Z_2$ similarly has no element of order $8$.



      The question, though, is does $G/H$ have an element of order $8$; or an element of order $4$. It doesn't have an element of order $8$, because the coset $(0,1)+H$ has order $4$. And we can see that no other coset has order $8$.



      So there's our answer: $mathbb Z_4oplusmathbb Z_2$.






      share|cite|improve this answer











      $endgroup$
















        1












        1








        1





        $begingroup$

        But $mathbb Z_4oplusmathbb Z_2$ similarly has no element of order $8$.



        The question, though, is does $G/H$ have an element of order $8$; or an element of order $4$. It doesn't have an element of order $8$, because the coset $(0,1)+H$ has order $4$. And we can see that no other coset has order $8$.



        So there's our answer: $mathbb Z_4oplusmathbb Z_2$.






        share|cite|improve this answer











        $endgroup$



        But $mathbb Z_4oplusmathbb Z_2$ similarly has no element of order $8$.



        The question, though, is does $G/H$ have an element of order $8$; or an element of order $4$. It doesn't have an element of order $8$, because the coset $(0,1)+H$ has order $4$. And we can see that no other coset has order $8$.



        So there's our answer: $mathbb Z_4oplusmathbb Z_2$.







        share|cite|improve this answer














        share|cite|improve this answer



        share|cite|improve this answer








        edited Dec 5 '18 at 5:57

























        answered Dec 5 '18 at 4:56









        Chris CusterChris Custer

        11.5k3824




        11.5k3824






























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